Asymptotic behaviour of a random walk killed on a finite set

Kohei Uchiyama

Published 2016-08-23Version 1

We study asymptotic behavior, for large time $n$, of the transition probability of a two-dimensional random walk killed when entering into a non-empty finite subset $A$. We show that it behaves like $4 \tilde u_A(x) \tilde u_{-A}(-y) (\lg n)^{-2} p^n(y- x)$ for large $n$, uniformly in the parabolic regime $|x|\vee |y| =O(\sqrt n)$, where $p^n(y-x)$ is the transition kernel of the random walk (without killing) and $\tilde u_A$ is the unique harmonic function in the 'exterior of $A$' satisfying the boundary condition $\tilde u_A(x) \sim \lg |x|$ at infinity.